/*                                                     i1.c
 *
 *     Modified Bessel function of order one
 *
 *
 *
 * SYNOPSIS:
 *
 * double x, y, i1();
 *
 * y = i1( x );
 *
 *
 *
 * DESCRIPTION:
 *
 * Returns modified Bessel function of order one of the
 * argument.
 *
 * The function is defined as i1(x) = -i j1( ix ).
 *
 * The range is partitioned into the two intervals [0,8] and
 * (8, infinity).  Chebyshev polynomial expansions are employed
 * in each interval.
 *
 *
 *
 * ACCURACY:
 *
 *                      Relative error:
 * arithmetic   domain     # trials      peak         rms
 *    IEEE      0, 30       30000       1.9e-15     2.1e-16
 *
 *
 */
/*							i1e.c
 *
 *	Modified Bessel function of order one,
 *	exponentially scaled
 *
 *
 *
 * SYNOPSIS:
 *
 * double x, y, i1e();
 *
 * y = i1e( x );
 *
 *
 *
 * DESCRIPTION:
 *
 * Returns exponentially scaled modified Bessel function
 * of order one of the argument.
 *
 * The function is defined as i1(x) = -i exp(-|x|) j1( ix ).
 *
 *
 *
 * ACCURACY:
 *
 *                      Relative error:
 * arithmetic   domain     # trials      peak         rms
 *    IEEE      0, 30       30000       2.0e-15     2.0e-16
 * See i1().
 *
 */

/*                                                     i1.c 2          */


/*
 * Cephes Math Library Release 2.8:  June, 2000
 * Copyright 1985, 1987, 2000 by Stephen L. Moshier
 */

#include "mconf.h"

/* Chebyshev coefficients for exp(-x) I1(x) / x
 * in the interval [0,8].
 *
 * lim(x->0){ exp(-x) I1(x) / x } = 1/2.
 */

static double A[] = {
    2.77791411276104639959E-18,
    -2.11142121435816608115E-17,
    1.55363195773620046921E-16,
    -1.10559694773538630805E-15,
    7.60068429473540693410E-15,
    -5.04218550472791168711E-14,
    3.22379336594557470981E-13,
    -1.98397439776494371520E-12,
    1.17361862988909016308E-11,
    -6.66348972350202774223E-11,
    3.62559028155211703701E-10,
    -1.88724975172282928790E-9,
    9.38153738649577178388E-9,
    -4.44505912879632808065E-8,
    2.00329475355213526229E-7,
    -8.56872026469545474066E-7,
    3.47025130813767847674E-6,
    -1.32731636560394358279E-5,
    4.78156510755005422638E-5,
    -1.61760815825896745588E-4,
    5.12285956168575772895E-4,
    -1.51357245063125314899E-3,
    4.15642294431288815669E-3,
    -1.05640848946261981558E-2,
    2.47264490306265168283E-2,
    -5.29459812080949914269E-2,
    1.02643658689847095384E-1,
    -1.76416518357834055153E-1,
    2.52587186443633654823E-1
};

/* Chebyshev coefficients for exp(-x) sqrt(x) I1(x)
 * in the inverted interval [8,infinity].
 *
 * lim(x->inf){ exp(-x) sqrt(x) I1(x) } = 1/sqrt(2pi).
 */
static double B[] = {
    7.51729631084210481353E-18,
    4.41434832307170791151E-18,
    -4.65030536848935832153E-17,
    -3.20952592199342395980E-17,
    2.96262899764595013876E-16,
    3.30820231092092828324E-16,
    -1.88035477551078244854E-15,
    -3.81440307243700780478E-15,
    1.04202769841288027642E-14,
    4.27244001671195135429E-14,
    -2.10154184277266431302E-14,
    -4.08355111109219731823E-13,
    -7.19855177624590851209E-13,
    2.03562854414708950722E-12,
    1.41258074366137813316E-11,
    3.25260358301548823856E-11,
    -1.89749581235054123450E-11,
    -5.58974346219658380687E-10,
    -3.83538038596423702205E-9,
    -2.63146884688951950684E-8,
    -2.51223623787020892529E-7,
    -3.88256480887769039346E-6,
    -1.10588938762623716291E-4,
    -9.76109749136146840777E-3,
    7.78576235018280120474E-1
};

double i1(x)
double x;
{
    double y, z;

    z = fabs(x);
    if (z <= 8.0) {
	y = (z / 2.0) - 2.0;
	z = chbevl(y, A, 29) * z * exp(z);
    }
    else {
	z = exp(z) * chbevl(32.0 / z - 2.0, B, 25) / sqrt(z);
    }
    if (x < 0.0)
	z = -z;
    return (z);
}

/*                                                     i1e()   */

double i1e(x)
double x;
{
    double y, z;

    z = fabs(x);
    if (z <= 8.0) {
	y = (z / 2.0) - 2.0;
	z = chbevl(y, A, 29) * z;
    }
    else {
	z = chbevl(32.0 / z - 2.0, B, 25) / sqrt(z);
    }
    if (x < 0.0)
	z = -z;
    return (z);
}
